Schreier vector mathematics , especially the field of computational group theory , a Schreier vector reducing the time and space complexity required to calculate orbits of a permutation group .Overview Suppose G is a finite group with generating sequence which acts on the finite set . A common task in computational group theory is to compute the orbit of some element under G. At the same time , one can record a Schreier vector for. This vector can then be used to find an element satisfying, for any. Use of Schreier vectors to perform this requires less storage space and time complexity than storing these g explicitly.All variables used here are defined in the overview . For forUse in algorithms illustrate , using pseudocode , the use of Schreier vectors in two algorithms Algorithm to compute the orbit of ω under G and the corresponding Schreier vector Algorithm to find a g in G such that ω g α for some α in Ω , using the v from the first algorithm
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